Approximate groups and doubling metrics
Classical Analysis and ODEs
2012-12-04 v2 Combinatorics
Abstract
We develop a version of Freiman's theorem for a class of non-abelian groups, which includes finite nilpotent, supersolvable and solvable A-groups. To do this we have to replace the small doubling hypothesis with a stronger relative polynomial growth hypothesis akin to that in Gromov's theorem (although with an effective range), and the structures we find are balls in (left and right) translation invariant pseudo-metrics with certain well behaved growth estimates. Our work complements three other recent approaches to developing non-abelian versions of Freiman's theorem by Breuillard and Green, Fischer, Katz and Peng, and Tao.
Keywords
Cite
@article{arxiv.0912.0305,
title = {Approximate groups and doubling metrics},
author = {Tom Sanders},
journal= {arXiv preprint arXiv:0912.0305},
year = {2012}
}
Comments
21 pp. Corrected typos. Changed title from `From polynomial growth to metric balls in monomial groups'